PT Journal
AU Ramirez-Uribe, S
   Hernandez-Pinto, RJ
   Rodrigo, G
   Sborlini, GFR
TI From Five-Loop Scattering Amplitudes to Open Trees with the Loop-Tree Duality
SO Symmetry-Basel
JI Symmetry-Basel
PY 2022
BP 2571 - 14pp
VL 14
IS 12
DI 10.3390/sym14122571
LA English
DE perturbative QFT; higher-order calculations; multiloop Feynman integrals
AB Characterizing multiloop topologies is an important step towards developing novel methods at high perturbative orders in quantum field theory. In this article, we exploit the Loop-Tree Duality (LTD) formalism to analyse multiloop topologies that appear for the first time at five loops. Explicitly, we open the loops into connected trees and group them according to their topological properties. Then, we identify a kernel generator, the so-called N7MLT universal topology, that allows us to describe any scattering amplitude of up to five loops. Furthermore, we provide factorization and recursion relations that enable us to write these multiloop topologies in terms of simpler subtopologies, including several subsets of Feynman diagrams with an arbitrary number of loops. Our approach takes advantage of many symmetries present in the graphical description of the original fundamental five-loop topologies. The results obtained in this article might shed light into a more efficient determination of higher-order corrections to the running couplings, which are crucial in the current and future precision physics program.
ER